Abstract

This paper explains the basic elements of an approach to
physically-based modeling which is well suited for interactive use. It is
simple, fast, and quite stable, and in its basic version the method does not
require knowledge of advanced mathematical subjects (although it is based on a
solid mathematical foundation). It allows for simulation of both cloth; soft
and rigid bodies; and even articulated or constrained bodies using both forward
and inverse kinematics.

The algorithms were developed for IO Interactive�s game Hitman: Codename
47. There, among other things, the physics system was responsible for the
movement of cloth, plants, rigid bodies, and for making dead human bodies fall
in unique ways depending on where they were hit, fully interacting with the
environment (resulting in the press oxymoron �lifelike death animations�).

The article also deals with subtleties like penetration test
optimization and friction handling.

1Introduction

The use of physically-based modeling to produce nice-looking animation
has been considered for some time and many of the existing techniques are
fairly sophisticated. Different approaches have been proposed in the literature
[Baraff, Mirtich, Witkin, and others] and much effort has been put into the
construction of algorithms that are accurate and reliable. Actually, precise
simulation methods for physics and dynamics have been known for quite some time
from engineering. However, for games and interactive use, accuracy is really
not the primary concern (although it�s certainly nice to have) � rather, here
the important goals are believability (the programmer can cheat as much
as he wants if the player still feels immersed) and speed of execution (only
a certain time per frame will be allocated to the physics engine). In the case
of physics simulation, the word believability also covers stability; a method
is no good if objects seem to drift through obstacles or vibrate when they
should be lying still, or if cloth particles tend to �blow up�.

The methods demonstrated in this paper were created in an attempt to
reach these goals. The algorithms were developed and implemented by the author
for use in IO Interactive�s computer game Hitman: Codename 47, and have all
been integrated in IO�s in-house game engine Glacier. The methods proved to be
quite simple to implement (compared to other schemes at least) and have high
performance.

The algorithm is iterative such that, from a certain point, it can be
stopped at any time. This gives us a very useful time/accuracy trade-off: If a
small source of inaccuracy is accepted, the code can be allowed to run faster;
this error margin can even be adjusted adaptively at run-time. In some cases,
the method is as much as an order of magnitude faster than other existing
methods. It also handles both collision and resting contact in the same
framework and nicely copes with stacked boxes and other situations that stress
a physics engine.

In overview, the success of the method comes from the right combination
of several techniques that all benefit from each other:

A so-called Verlet
integration scheme.

Handling
collisions and penetrations by projection.

A simple
constraint solver using relaxation.

A nice square
root approximation that gives a solid speed-up.

Modeling
rigid bodies as particles with constraints.

An optimized
collision engine with the ability to calculate penetration depths.

Each of the above subjects will be explained shortly. In writing this
document, the author has tried to make it accessible to the widest possible
audience without losing vital information necessary for implementation. This
means that technical mathematical explanations and notions are kept to a
minimum if not crucial to understanding the subject. The goal is demonstrating
the possibility of implementing quite advanced and stable physics simulations
without dealing with loads of mathematical intricacies.

The content is organized as follows. First, in Section 2, a �velocity-less� representation of a particle
system will be described. It has several advantages, stability most notably and
the fact that constraints are simple to implement. Section 3 describes how collision handling takes place. Then,
in Section 4, the particle system is extended with constraints allowing
us to model cloth. Section 5 explains how to set up a suitably constrained
particle system in order to emulate a rigid body. Next, in Section 6, it is demonstrated how to further extend the system
to allow articulated bodies (that is, systems of interconnected rigid bodies
with angular and other constraints). Section 7 contains various notes and shares some experience on
implementing friction

The heart of the simulation is a particle system. Typically, in
implementations of particle systems, each particle has two main variables: Its
position x and its velocity v. Then in the time-stepping loop,
the new position x� and velocity v� are often computed by
applying the rules

where Dt is the time
step, and a is the acceleration computed using Newton�s law f=ma
(where f is the accumulated force acting on the particle). This is
simple Euler integration.

Here, however, we choose a velocity-less representation and another
integration scheme: Instead of storing each particle�s position and velocity,
we store its current position xand its previous position x*.
Keeping the time step fixed, the update rule (or integration step) is then

This is called Verlet integration (see [Verlet]) and is used intensely
when simulating molecular dynamics. It is quite stable since the velocity is
implicitly given and consequently it is harder for velocity and position to
come out of sync.� (As a side note, the
well-known demo effect for creating ripples in water uses a similar approach.)
It works due to the fact that 2x-x*=x+(x-x*)
and x-x* is an approximation of the current velocity (actually,
it�s the distance traveled last time step). It is not always very accurate
(energy might leave the system, i.e., dissipate) but it�s fast and stable. By
changing the update rule to something like x�=1.99x-0.99x*+a*�Dt2 a
small amount of drag can also be introduced to the system.

At the end of each step, for each particle the current position x
gets stored in the corresponding variable x*. Note that when
manipulating many particles, a useful optimization is possible by simply
swapping array pointers.

The resulting code would look something like this (the Vector3 class
should contain the appropriate member functions and overloaded operators for
manipulation of vectors):

// Sample code for
physics simulation

class ParticleSystem
{

����� Vector3���� m_x[NUM_PARTICLES];
// Current positions

����� Vector3���� m_oldx[NUM_PARTICLES];
// Previous positions

����� Vector3���� m_a[NUM_PARTICLES];
// Force accumulators

����� Vector3���� m_vGravity;
// Gravity

����� float������ m_fTimeStep;

public:

����� void ������ TimeStep();

private:

����� void ������ Verlet();

����� void ������ SatisfyConstraints();

����� void������� AccumulateForces();

//��� (constructors, initialization etc. omitted)

};

// Verlet integration
step

void
ParticleSystem::Verlet() {

����� for(int i=0; i<NUM_PARTICLES; i++) {

����������� Vector3& x = m_x[i];

����������� Vector3 temp = x;

����������� Vector3& oldx = m_oldx[i];

����������� Vector3& a = m_a[i];

����������� x += x-oldx+a*fTimeStep*fTimeStep;

����������� oldx = temp;

����� }

}

// This function
should accumulate forces for each particle

void
ParticleSystem::AccumulateForces()

{����

// All particles are
influenced by gravity

����� for(int i=0; i<NUM_PARTICLES; i++)� m_a[i] = m_vGravity;

}

// Here constraints
should be satisfied

void ParticleSystem::SatisfyConstraints()
{

// Ignore this
function for now

}

void
ParticleSystem::TimeStep() {

����� AccumulateForces();

����� Verlet();

����� SatisfyConstraints();

}

The above code has been written for clarity, not speed. One optimization
would be using arrays of float instead of Vector3 for the state representation.
This might also make it easier to implement the system on a vector processor.

This probably doesn�t sound very groundbreaking yet. However, the
advantages should become clear soon when we begin to use constraints and switch
to rigid bodies. It will then be demonstrated how the above integration scheme
leads to increased stability and a decreased amount of computation when
compared to other approaches.

Try setting a=(0,0,1), for example, and use the start condition x=(1,0,0),
x*=(0,0,0), then do a couple of iterations by hand and see what happens.

So-called penalty-based schemes handle contact by inserting springs at
the penetration points. While this is very simple to implement, it has a number
of serious drawbacks. For instance, it is hard to choose suitable spring
constants such that, on one hand, objects don�t penetrate too much and, on the
other hand, the resulting system doesn�t get unstable. In other schemes for
simulating physics, collisions are handled by rewinding time (by binary search
for instance) to the exact point of collision, handling the collision
analytically from there and then restarting the simulation � this is not very
practical from a real-time point of view since the code could potentially run
very slowly when there are a lot of collisions.

Here, we use yet another strategy. Offending points are simply projected
out of the obstacle. By projection, loosely speaking, we mean moving the point
as little as possible until it is free of the obstacle. Normally, this means
moving the point perpendicularly out towards the collision surface.

Let�s examine an example. Assume that our world is the inside of the
cube (0,0,0)-(1000,1000,1000) and assume also that the particles� restitution
coefficient is zero (that is, particles do not bounce off surfaces when
colliding). To keep all positions inside the valid interval, the corresponding
projection code would be:

// Implements particles in a box

void ParticleSystem::SatisfyConstraints()
{

����� for(int i=0; i<NUM_PARTICLES; i++) { //
For all particles

����������� Vector3& x = m_x[i];

����������� x = vmin(vmax(x, Vector3(0,0,0)),

Vector3(1000,1000,1000));

����� }

}

(vmax operates on
vectors taking the component-wise maximum whereas vmin takes the component-wise
minimum.) This keeps all particle positions inside the cube and handles both
collisions and resting contact. The beauty of the Verlet integration scheme is
that the corresponding changes in velocity will be handled automatically. In
the following calls to TimeStep(), the velocity is automatically regulated to
contain no component in the normal direction of the surface (corresponding to a
restitution coefficient of zero). See Figure 1.

Try it out � there is no need to directly cancel the velocity in the
normal direction. While the above might seem somewhat trivial when looking at
particles, the strength of the Verlet integration scheme is now beginning to
shine through and should really become apparent when introducing constraints
and coupled rigid bodies in a moment.

A common model for cloth consists of a simple system of interconnected
springs and particles. However, it is not always trivial to solve the
corresponding system of differential equations. It suffers from some of the
same problems as the penalty-based systems: Strong springs leads to stiff
systems of equations that lead to instability if only simple integration
techniques are used, or at least bad performance � which leads to pain.
Conversely, weak springs lead to elastically looking cloth.

However, an interesting thing happens if we let the stiffness of the
springs go to infinity: The system suddenly becomes solvable in a stable way
with a very simple and fast approach. But before we continue talking about
cloth, let�s revisit the previous example. The cube considered above can be
thought of as a collection of unilateral (inequality) constraints (one for each
side of the cube) on the particle positions that should be satisfied at all
times:

�(C1)

In the example, constraints were satisfied (that is, particles are kept
inside the cube) by simply modifying offending positions by projecting the
particles onto the cube surface. To satisfy (C1), we use the following
pseudo-code

// Pseudo-code to satisfy (C1)

for i=1,2,3

set xi=min{max{xi, 0}, 1000}

One may think of this process as inserting infinitely stiff springs
between the particle and the penetration surface � springs that are exactly so
strong and suitably damped that instantly they will attain their rest length
zero.

We now extend the experiment to model a stick of length 100. We do this
by setting up two individual particles (with positions x1 and x2) and then require them to be
a distance of 100 apart. Expressed mathematically, we get the following
bilateral (equality) constraint:

Although the particles might be correctly placed initially, after one
integration step the separation distance between them might have become
invalid. In order to obtain the correct distance once again, we move the
particles by projecting them onto the set of solutions described by (C2). This
is done by pushing the particles directly away from each other or by pulling
them closer together (depending on whether the erroneous distance is too small
or too large). See Figure 2.

The pseudo-code for satisfying the constraint (C2) is

// Pseudo-code to
satisfy (C2)

delta = x2-x1;

deltalength =
sqrt(delta*delta);

diff =
(deltalength-restlength)/deltalength;

x1 += delta*0.5*diff;

x2 -= delta*0.5*diff;

Note that delta is a vector so delta*delta is actually a dot product.
With restlength=100 the above pseudo-code will push apart or pull together the
particles such that they once more attain the correct distance of 100 between
them. Again we may think of the situation as if a very stiff spring with rest
length 100 has been inserted between the particles such that they are instantly
placed correctly.

Now assume that we still want the particles to satisfy the cube
constraints. By satisfying the stick constraint, however, we may have
invalidated one or more of the cube constraints by pushing a particle out of
the cube. This situation can be remedied by immediately projecting the
offending particle position back onto the cube surface once more � but then we
end up invalidating the stick constraint again.

Really, what we should do is solve for all constraints at once, both
(C1) and (C2). This would be a matter of solving a system of equations. However,
we choose to proceed indirectly by local iteration. We simply repeat the two
pieces of pseudo-code a number of times after each other in the hope that the
result is useful. This yields the following code:

// Implements
simulation of a stick in a box

void
ParticleSystem::SatisfyConstraints() {

for(int j=0; j<NUM_ITERATIONS; j++) {

����� // First
satisfy (C1)

����������� for(int i=0; i<NUM_PARTICLES;
i++) { // For all particles

����������������� Vector3& x = m_x[i];

����������������� x = vmin(vmax(x,
Vector3(0,0,0)),

Vector3(1000,1000,1000));

����������� }

����������� // Then satisfy (C2)

����������� Vector3& x1 = m_x[0];

����������� Vector3& x2 = m_x[1];

Vector3 delta = x2-x1;

float deltalength = sqrt(delta*delta);

float diff = (deltalength-restlength)/deltalength;

x1 += delta*0.5*diff;

x2 -= delta*0.5*diff;

����� }

}

(Initialization of the two particles has been omitted.) While this
approach of pure repetition might appear somewhat na�ve, it turns out that it
actually converges to the solution that we are looking for! The method is
called relaxation (or Jacobi or Gauss-Seidel iteration depending on how you do
it exactly, see [Press]). It works by consecutively satisfying various local
constraints and then repeating; if the conditions are right, this will converge
to a global configuration that satisfies all constraints at the same time. It
is useful in many other situations where several interdependent constraints
have to be satisfied at the same time.

The number of necessary iterations varies depending on the physical
system simulated and the amount of motion. It can be made adaptive by measuring
the change from last iteration. If we stop the iterations early, the result
might not end up being quite valid but because of the Verlet scheme, in next
frame it will probably be better, next frame even more so etc. This means that
stopping early will not ruin everything although the resulting animation might
appear somewhat sloppier.

Cloth simulation

The fact that a stick constraint can be thought of as a really hard
spring should make apparent its usefulness for cloth simulation as sketched in the
beginning of this section. Assume, for example, that a hexagonal mesh of
triangles describing the cloth has been constructed. For each vertex a particle
is initialized and for each edge a stick constraint between the two
corresponding particles is initialized (with the constraint�s �rest length�
simply being the initial distance between the two vertices).

The function HandleConstraints() then uses relaxation over all
constraints. The relaxation loop could be iterated several times. However, to
obtain nicely looking animation, actually for most pieces of cloth only one
iteration is necessary! This means that the time usage in the cloth simulation
depends mostly on the N square root operations and the N divisions performed
(where N denotes the number of edges in the cloth mesh). As we shall see, a
clever trick makes it possible to reduce this to N divisions per frame update �
this is really fast and one might argue that it probably can�t get much faster.

// Implements cloth
simulation

struct Constraint {

����� int�� particleA,
particleB;

����� floatrestlength;

};

// Assume that an
array of constraints, m_constraints, exists

void
ParticleSystem::SatisfyConstraints() {

for(int j=0; j<NUM_ITERATIONS; j++) {

����� for(int
i=0; i<NUM_CONSTRAINTS; i++) {

����� ����� Constraint&
c = m_constraints[i];

����������������� Vector3& x1 =
m_x[c.particleA];

����������� Vector3&
x2 = m_x[c.particleB];

Vector3 delta = x2-x1;

float deltalength = sqrt(delta*delta);

float diff=(deltalength-c.restlength)/deltalength;

x1 += delta*0.5*diff;

x2 -= delta*0.5*diff;

����� }

����� // Constrain
one particle of the cloth to origo

����� m_x[0] =
Vector3(0,0,0);

����� }

}

We now discuss how to get rid of the square root operation. If the
constraints are all satisfied (which they should be at least almost), we
already know what the result of the square root operation in a particular
constraint expression ought to be, namely the rest length r of the
corresponding stick. We can use this fact to approximate the square root
function. Mathematically, what we do is approximate the square root function by
its 1st order Taylor-expansion at a neighborhood of the squared rest
length r*r (this is equivalent to one Newton-Raphson iteration with initial
guess r). After some rewriting, we obtain the following pseudo-code:

// Pseudo-code for
satisfying (C2) using sqrt approximation

delta = x2-x1;

delta*=restlength*restlength/(delta*delta+restlength*restlength)-0.5;

x1 += delta;

x2 -= delta;

Notice that if the distance is already correct (that is, if
|delta|=restlength), then one gets delta=(0,0,0) and no change is going to
happen.

Per constraint we now use zero square roots, one division only,
and the squared value restlength*restlength can even be precalculated! The
usage of time consuming operations is now down to N divisions per frame (and
the corresponding memory accesses) � it can�t be done much faster than that and
the result even looks quite nice. Actually, in Hitman, the overall speed of the
cloth simulation was limited mostly by how many triangles it was possible to
push through the rendering system.

The constraints are not guaranteed to be satisfied after one iteration
only, but because of the Verlet integration scheme, the system will quickly
converge to the correct state over some frames. In fact, using only one
iteration and approximating the square root removes the stiffness that appears
otherwise when the sticks are perfectly stiff.

�

By placing support sticks between strategically chosen couples of
vertices sharing a neighbor, the cloth algorithm can be extended to simulate
plants. Again, in Hitman only one pass through the relaxation loop was enough
(in fact, the low number gave the plants exactly the right amount of bending
behavior).

The code and the equations covered in this section assume that all
particles have identical mass. Of course, it is possible to model particles
with different masses, the equations only get a little more complex.

To satisfy (C2) while respecting particle masses, use the following
code:

// Pseudo-code to
satisfy (C2)

delta = x2-x1;

deltalength =
sqrt(delta*delta);

diff = (deltalength-restlength)

/(deltalength*(invmass1+invmass2));

x1 +=
invmass1*delta*diff;

x2 -=
invmass2*delta*diff;

Here invmass1 and invmass2 are the numerical inverses of the two masses.
If we want a particle to be immovable, simply set invmass=0 for that particle
(corresponding to an infinite mass). Of course in the above case, the square
root can also be approximated for a speed-up.

The equations governing motion of rigid bodies were discovered long
before the invention of modern computers. To be able to say anything useful at
that time, mathematicians needed the ability to manipulate expressions
symbolically. In the theory of rigid bodies, this lead to useful notions and
tools such as inertia tensors, angular momentum, torque, quaternions for representing
orientations etc. However, with the current ability to process huge amounts of
data numerically, it has become feasible and in some cases even advantageous to
break down calculations to simpler elements when running a simulation. In the
case of 3D rigid bodies, this could mean modeling a rigid body by four
particles and six constraints (giving the correct amount of degrees of freedom,
4x3-6 = 6). This simplifies a lot of aspects and it�s exactly what we will do
in the following.

�

Consider a tetrahedron and place a particle at each of the four
vertices. In addition, for each of the six edges on the tetrahedron create a
distance constraint like the stick constraint discussed in the previous
section. This is actually enough to simulate a rigid body. The tetrahedron can
be let loose inside the cube world from earlier and the Verlet integrator will
let it move correctly. The function SatisfyConstraints() should take care of
two things: 1) That particles are kept inside the cube (like previously), and 2)
That the six distance constraints are satisfied. Again, this can be done using
the relaxation approach; 3 or 4 iterations should be enough with optional
square root approximation.

Now clearly, in
general rigid bodies do not behave like tetrahedrons collision-wise (although
they might do so kinetically). There is also another problem: Presently,
collision detection between the rigid body and the world exterior is on a
vertex-only basis, that is, if a vertex is found to be outside the world it is
projected inside again. This works fine as long as the inside of the world is
convex. If the world were non-convex then the tetrahedron and the world
exterior could actually penetrate each other without any of the tetrahedron
vertices being in an illegal region (see Figure 3 where the triangle represents
the 2D analogue of the tetrahedron). This problem is handled in the following.

We�ll first consider a simpler version of the problem. Consider the
stick example from earlier and assume that the world exterior has a small bump
on it. The stick can now penetrate the world exterior without any of the two
stick particles leaving the world (see Figure 4). We won�t go into the
intricacies of constructing a collision detection engine since this is a
science in itself. Instead we assume that there is a subsystem available which
allows us to detect the collision. Furthermore we assume that the subsystem can
reveal to us the penetration depth and identify the penetration points on each
of the two colliding objects. (One definition of penetration points and
penetration depth goes like this: The penetration distance dp is the
shortest distance that would prevent the two objects from penetrating if one
were to translate one of the objects by the distance dp in a
suitable direction. The penetration points are the points on each object that
just exactly touch the other object after the aforementioned translation has
taken place.)

�

Take a look
again at Figure 4. Here the stick has moved through the bump after the Verlet
step. The collision engine has identified the two points of penetration, p
and q. In Figure 4a, p is actually identical to the position of
particle 1, i.e., p=x1. In Figure 4b, p lies between x1
and x2 at a position � of the stick length from x1. In both
cases, the point p lies on the stick and consequently it can be
expressed as a linear combination of x1 and x2, p=c1 x1+c2
x2 such that c1+c2=1. In the first case, c1=1 and c2=0, in the second
case, c1=0.75 and c2=0.25. These values tell us how much we should move the
corresponding particles.

To fix the invalid configuration of the stick, it should be moved
upwards somehow. Our goal is to avoid penetration by moving p to the
same position as q. We do this by adjusting the positions of the two
particles x1 and x2 in the direction of the vector between p
and q, D=q-p.

In the first case, we simply project x1 out of the invalid region
like earlier (in the direction of q) and that�s it (x2 is not
touched). In the second case, p is still nearest to x1 and one
might reason that consequently x1 should be moved more than x2.
Actually, since p=0.75 x1 + 0.25 x2, we will choose to
move x1 by an amount of 0.75 each time we move x2 by an amount of
0.25. In other words, the new particle positions x1� and x2� are
given by the expressions

����� (*)

where l is some unknown
value. The new position of p after moving both particles is p�=c1
x1�+ c2 x2�.

Recall that we want p�=q, i.e., we should choose l exactly such that p� ends up coinciding with q. Since we
move the particles only in the direction of D, also p moves in the direction of D and consequently the solution to the equation p�=q
can be found by solving

�� (**)

for l. Expanding the
left-hand side yields:

which together with the right-hand side of (**) gives

Plugging l into (*) gives us
the new positions of the particles for which p� coincide with q.

Figure 5 shows the situation after moving the particles. We have no
object penetration but now the stick length constraint has been violated. To
fix this, we do yet another iteration of the relaxation loop (or several) and
we�re finished.

The above
strategy also works for the tetrahedron in a completely analogous fashion.
First the penetration points p and q are found (they may also be
points interior to a triangle), and p is expressed as a linear
combination of the four particles p=c1 x1+c2 x2+c3 x3+c4
x4 such that c1+c2+c3+c4=1 (this calls for solving a small system of
linear equations). After finding D=q-p,
one computes the value

and the new positions are then given by

Here, we have collided a single rigid body with an immovable world. The
above method generalizes to handle collisions of several rigid bodies. The
collisions are processed for one pair of bodies at a time. Instead of moving
only p, in this case both p and q are moved towards each
other.

Again, after adjusting the particle positions
such that they satisfy the non-penetration constraints, the six distance
constraints that make up the rigid body should be taken care of and so on. With
this method, the tetrahedron can even be imbedded inside another object that
can be used instead of the tetrahedron itself to handle collisions. In Figure
6, the tetrahedron is embedded inside a cube.

First, the cube
needs to be �fastened� to the tetrahedron in some way. One approach would be
choosing the system mass midpoint 0.25*(x1+x2+x3+x4)
as the cube�s position and then derive an orientation matrix by examining the
current positions of the particles. When a collision/penetration is found, the
collision point p (which in this case will be placed on the cube) is
then treated exactly as above and the positions of the particles are updated
accordingly. As an optimization, it is possible to precompute the values of
c1-c4 for all vertices of the cube. If the penetration point p is a
vertex, the values for c1-c4 can be looked up and used directly. Otherwise, p
lies on the interior of a surface triangle or one of its edges and the values
of c1-c4 can then be interpolated from the precomputed values of the
corresponding triangle vertices.

Usually, 3 to 4 relaxation iterations are enough. The bodies will not
behave as if they were completely rigid since the relaxation iterations are
stopped prematurely. This is mostly a nice feature, actually, as there is no
such thing as perfectly rigid bodies � especially not human bodies. It also
makes the system more stable.

By rearranging the positions of the particles that make up the
tetrahedron, the physical properties can be changed accordingly
(mathematically, the inertia tensor changes as the positions and masses of the
particles are changed).

Other arrangements of particles and constraints than a tetrahedron are
possible such as placing the particles in the pattern of a coordinate system
basis, i.e. at (0,0,0), (1,0,0), (0,1,0), (0,0,1). Let a, b, and c
be the vectors from particle 1 to particles 2, 3, and 4, respectively.
Constrain the particles� positions by requiring vectors a, b, and
c to have length 1 and the angle between each of the three pairs of
vectors to be 90 degrees (the corresponding dot products should be zero).
(Notice, that this again gives four particles and six constraints.)

It is possible to connect multiple rigid bodies by hinges, pin joints,
and so on. Simply let two rigid bodies share a particle, and they will be
connected by a pin joint. Share two particles, and they are connected by a
hinge. See Figure

7.

It is also possible to connect two rigid bodies by a stick constraint or
any other kind of constraint � to do this, one simply adds the corresponding
�fix-up� code to the relaxation loop.

This approach
makes it possible to construct a complete model of an articulated human body.
For additional realism, various angular constraints will have to be implemented
as well. There are different ways to accomplish this. A simple way is using
stick constraints that are only enforced if the distance between two particles
falls below some threshold (mathematically, we have a unilateral (inequality)
distance constraint, |x2-x1|>100). As a direct result, the two
particles will never come too close to each other. See Figure 8.

Another method for restraining angles is to satisfy a dot product
constraint:

Particles can also be restricted to move, for example, in certain planes
only. Once again, particles with positions not satisfying the above-mentioned
constraints should be moved � deciding exactly how is slightly more complicated
that with the stick constraints.

Actually, in Hitman corpses aren�t composed of rigid bodies modeled by
tetrahedrons. They are simpler yet, as they consist of particles connected by
stick constraints in effect forming stick figures. See Figure 9. The position
and orientation for each limb (a vector and a matrix) are then derived for
rendering purposes from the particle positions using various cross products and
vector normalizations (making certain that knees and elbows bend naturally).

In other words, seen isolated each limb is not a rigid body with the
usual 6 degrees of freedom. This means that physically the rotation
around the length axis of a limb is not simulated. Instead, the skeletal
animation system used to setup the polygonal mesh of the character is forced to
orientate the leg, for instance, such that the knee appears to bend naturally.
Since rotation of legs and arms around the length axis does not comprise the
essential motion of a falling human body, this works out okay and actually
optimizes speed by a great

deal.

�

Angular constraints are implemented to enforce limitations of the human
anatomy. Simple self collision is taken care of by strategically introducing
inequality distance constraints as discussed above, for example between the two
knees � making sure that the legs never cross.

For collision with the environment, which consists of triangles, each
stick is modeled as a capped cylinder. Somewhere in the collision system, a
subroutine handles collisions between capped cylinders and triangles. When a
collision is found, the penetration depth and points are extracted, and the
collision is then handled for the offending stick in question exactly as
described in the beginning of Section 5.

Naturally, a lot of additional tweaking was necessary to get the result
just right.

To influence the motion of a simulated object, one simply moves the
particles correspondingly. If a person is hit at the shoulder, move the
shoulder particle backwards over a distance proportional to the strength of the
blow. The Verlet integrator will then automatically set the shoulder in motion.

This also makes it easy for the simulation to �inherit� velocities from
an underlying traditional animation system. Simply record the positions of the
particles for two frames and then give them to the Verlet integrator, which
then automatically continues the motion. Bombs can be implemented by pushing
each particle in the system away from the explosion over a distance inversely
proportional to the square distance between the particle and the bomb center.

It is possible to constrain a specific limb, say the hand, to a fixed
position in space. In this way, one can implement inverse kinematics (IK):
Inside the relaxation loop, keep setting the position of a specific particle
(or several particles) to the position(s) wanted. Giving the particle infinite
mass (invmass=0) helps making it immovable to the physics system. In Hitman,
this strategy is used when dragging corpses; the hand (or neck or foot) of the
corpse is constrained to follow the hand of the player.

Handling friction

Friction has not been taken care of yet. This means that unless we do
something more, particles will slide along the floor as if it were made of ice.
According to the Coulomb friction model, friction force depends on the size of
the normal force between the objects in contact. To implement this, we measure
the penetration depth dp when a penetration has occurred (before
projecting the penetration point out of the obstacle). After projecting the
particle onto the surface, the tangential velocity vt is then
reduced by an amount proportional to dp (the proportion factor being
the friction constant). This is done by appropriately modifying x*. See
the Figure 10. Care should be taken that the tangential velocity does not
reverse its direction � in this case one should simply be set it to zero since
this indicates that the penetration point has seized to move tangentially.
Other and better friction models than this could and should be implemented.

Collision detection

One of the bottlenecks in physics simulation as presented here lies in
the collision detection, which is potentially performed several times inside
the relaxation loop. It is possible, however, to iterate a different number of
times over the various constraints and still obtain good results.

In Hitman, the collision system works by culling all triangles inside
the bounding box of the object simulated (this is done using a octtree
approach). For each (static, background) triangle, a structure for fast
collision queries against capped cylinders is then constructed and cached. This
strategy gave quite a speed boost.

�

To prevent objects that are moving really fast from passing through
other obstacles (because of too large time steps), a simple test if performed.
Imagine the line (or a capped cylinder of proper radius) beginning at the
position of the object�s midpoint last frame and ending at the position of the
object�s midpoint at the current frame. If this line hits anything, then the
object position is set to the point of collision. Though this can theoretically
give problems, in practice it works fine.

Another collision �cheat� is used for dead bodies. If the unusual thing
happens that a fast moving limb ends up being placed with the ends of the
capped cylinder on each side of a wall, the cylinder is projected to the side
of the wall where the cylinder is connected to the torso.

Miscellaneous

The number of relaxation iterations used in Hitman vary between 1 and 10
with the kind of object simulated. Although this is not enough to accurately
solve the global system of constraints, it is sufficient to make motion seem
natural. The nice thing about this scheme is that inaccuracies do not
accumulate or persist visually in the system causing object drift or the like �
in some sense the combination of projection and the Verlet scheme manages to distribute
complex calculations over several frames (other schemes have to use further
stabilization techniques, like Baumgarte stabilization). Fortunately, the
inaccuracies are smallest or even nonexistent when there is little motion and
greatest when there is heavy motion � this is nice since fast or complex motion
somewhat masks small inaccuracies for the human eye.

�

A kind of soft bodies can also be implemented by using �soft�
constraints, i.e., constraints that are allowed to have only a certain
percentage of the deviation �repaired� each frame (i.e., if the rest length of
a stick between two particles is 100 but the actual distance is 60, the
relaxation code could first set the distance to 80 instead of 100, next frame
90, 95, 97.5 etc.).

As mentioned, we have purposefully refrained from using heavy
mathematical notation in order to reach an audience with a broader background.
This means that even though the methods presented are firmly based
mathematically, their origins may appear somewhat vague or even magical.

For the mathematically inclined, however, what we are doing is actually
a sort of time-stepping approach to solving differential inclusions (a variant
of differential equations) using a simple sort of interior-point algorithm (see
[Stewart] where a similar approach is discussed). When trying to satisfy the
constraints, we are actually projecting the system state onto the manifold
described by the constraints. This, in turn, is done by solving a system of
linear equations. The linear equations or code to solve the constraints can be
obtained by deriving the Jacobian of the constraint functions. In this article,
relaxation has been discussed as an implicit way of solving the system.
Although we haven�t touched the subject here, it is sometimes useful to change
the relaxation coefficient or even to use over-relaxation (see [Press] for an
explanation). Since relaxation solvers sometimes converge slowly, one might
also choose to explicitly construct the equation system and use other methods
to solve it (for example a sparse matrix conjugate gradient descent solver with
preconditioning using the results from the previous frame (thereby utilizing
coherence)).

Note that the Verlet integrator scheme exists in a number of variants,
e.g., the Leapfrog integrator and the velocity Verlet integrator. Accuracy
might be improved by using these.

Singularities (divisions by zero usually brought about by coinciding
particles) can be handled by slightly dislocating particles at random.

As an optimization, bodies should time out when they have fallen to
rest.

To toy with the animation system for dead characters in Hitman: Codename
47, open the Hitman.ini file and add the two lines �enableconsole 1� and
�consolecmd ip_debug 1� at the bottom. Pointing the cursor at an enemy and
pressing shift+F12 will cause a small bomb to explode in his vicinity sending
him flying. Press K to toggle free-cam mode (camera is controlled by cursor
keys, shift, and ctrl).

Note that since all operations basically take place on the particle
level, the algorithms should be very suitable for vector processing
(Playstation 2 for example).

This paper has described how a physics system was
implemented in Hitman.� The underlying
philosophy of combining iterative methods with a stable integrator has proven
to be successful and useful for implementation in computer games. Most notably,
the unified particle-based framework, which handles both collisions and
contact, and the ability to trade off speed vs. accuracy without accumulating
visually obvious errors are powerful features. Naturally, there are still many
specifics that can be improved upon. In particular, the tetrahedron model for
rigid bodies needs some work. This is in the works.

At IO Interactive, we have recently done some experiments with
interactive water and gas simulation using the full Navier-Stokes equations. We
are currently looking into applying techniques similar to the ones demonstrated
in this paper in the hope to produce faster and more stable water simulation.

9Acknowledgements

The author wishes to thank Jeroen Wagenaar for fruitful discussions and
the entire crew at IO Interactive for cooperation and for producing such a
great working environment.

Thomas Jakobsen is head of research and development at IO Interactive,
where he is developing new technology for the in-house engine, Glacier. He
created the physics simulation and the 3D pathfinder for IO's Hitman: Codename
47. Jakobsen earned his M.Sc. in engineering from The Technical University of
Denmark, where he also obtained his Ph.D. in mathematics. He spent a number of
years in academia and has published several scientific articles on
cryptanalysis.